Chong Ching Tong from River Valley High School, Singapore and Andrei Lazanu, age12, School: No. 205 Bucharest, Romania approached this problem in different ways.

Here is Chong's working:


8778 ×2 = 17556


Ö
 
17556
 
@ 132.5

 (132 ×133)
2
 = 8778

10296 ×2 = 20592


Ö
 
20592
 
@ 143.5

 (143 ×144)
2
 = 10296

13530 ×2 = 27060


Ö
 
27060
 
@ 164.5

 (164 ×165)
2
 = 13530

(8778)2 + (10296)2 = (13530)2

Here is Andrei's solution:

First I demonstrate that 8778, 10296 and 13530 are triangular numbers, i.e. they can be written in the form n(n+1)/2. In order to do this I decomposed the product of each of the three numbers by 2 in the hope to put it in the form n(n+1)/2. I found:

8778 * 2 = 2 2 * 3 * 7 *11 *19 = 132 * 133.

So,
8778 =  132 ×133
2

and so 8778 is a triangular number.

10296 * 2 = 2 2 * 11 * 13 = 143 * 144.

So,
0296 =  143 ×144
2

, and it is a triangular number.

13530 * 2 = 2 2 * 3 * 5 * 11 * 41 = 164 * 165.

So,
3530 =  164 ×165
2
is also a triangular number.

Now, I demonstrate that the three numbers are a Pythagorean triple. The greatest number is 13530.

13530 2 = 183060900

8778 2 + 10296 2 = 77053284 + 106007616 = 183060900

So, the three numbers are a Pythagorean triple